This article proposes the application of a new mathematical model of spots for solving inverse problems using a learning method, which is similar to using deep learning. In general, the spots represent vague figures in abstract “information spaces” or crisp figures with a lack of information about their shapes. However, crisp figures are regarded as a special and limiting case of spots. A basic mathematical apparatus, based on L4 numbers, has been developed for the representation and processing of qualitative information of elementary spatial relations between spots. Moreover, we defined L4 vectors, L4 matrices, and mathematical operations on them. The developed apparatus can be used in Artificial Intelligence, in particular, for knowledge ...
At the root of scientific discovery is the question of how to make sense of the world from empirical...
We live in a world where imaging systems are ubiquitous. From the cell phones in our pockets to our ...
Recent research in inverse problems seeks to develop a mathematically coherent foundation for combin...
Investigations of new and improved solutions to inverse problems are considered. Three of the solut...
International audienceClassical methods for inverse problems are mainly based on regularization theo...
Inverse problems are problems where we want to estimate the values of certain parameters of a system...
This paper presents a deep learning algorithm for tomographic reconstruction (GANrec). The algorithm...
AbstractMany works have shown strong connections between learning and regularization techniques for ...
In this thesis on data-driven methods in inverse problems we introduce several new methods to solve ...
Inverse problems have been widely studied in image processing, with applications in areas such as im...
The concept of an inverse problem is a familiar one to most scientists and engineers, particularly i...
Inverse problems deal with recovering the causes for a desired or given effect. Their presence acros...
Image recognition and reconstruction are common problems in many image processing systems. These pro...
Big data and deep learning are modern buzz words which presently infiltrate all fields of science an...
In this paper an innovative approach to microwave imaging, which combines a qualitative imaging tech...
At the root of scientific discovery is the question of how to make sense of the world from empirical...
We live in a world where imaging systems are ubiquitous. From the cell phones in our pockets to our ...
Recent research in inverse problems seeks to develop a mathematically coherent foundation for combin...
Investigations of new and improved solutions to inverse problems are considered. Three of the solut...
International audienceClassical methods for inverse problems are mainly based on regularization theo...
Inverse problems are problems where we want to estimate the values of certain parameters of a system...
This paper presents a deep learning algorithm for tomographic reconstruction (GANrec). The algorithm...
AbstractMany works have shown strong connections between learning and regularization techniques for ...
In this thesis on data-driven methods in inverse problems we introduce several new methods to solve ...
Inverse problems have been widely studied in image processing, with applications in areas such as im...
The concept of an inverse problem is a familiar one to most scientists and engineers, particularly i...
Inverse problems deal with recovering the causes for a desired or given effect. Their presence acros...
Image recognition and reconstruction are common problems in many image processing systems. These pro...
Big data and deep learning are modern buzz words which presently infiltrate all fields of science an...
In this paper an innovative approach to microwave imaging, which combines a qualitative imaging tech...
At the root of scientific discovery is the question of how to make sense of the world from empirical...
We live in a world where imaging systems are ubiquitous. From the cell phones in our pockets to our ...
Recent research in inverse problems seeks to develop a mathematically coherent foundation for combin...